The French Revolution provided Bentham with what appeared to him to be an exciting opportunity to influence the reconstruction of the French state. Drawing on his knowledge of English political and constitutional practice, as well as the theoretical resources he had developed in his own work, he suggested imaginative and innovative measures to achieve the peaceful and constitutional reform in France. In discussing the nature of representation he produced the earliest utilitarian justification of political equality and representative democracy, even recommending women's suffrage. Moreover, he provided a major critique of the dominant constitutional theory of the division of power, including both the doctrine of the balance of powers and that of the separation of powers. Turning his attention to Britain, for a time he advocated measures of parlimentary reform, but becoming disenchanted with the course of the Revolution he produced the celebrated 'Nonsense upon Stilts' (hithertoknown as 'Anarchical Fallacies'), the most devastating attack on the theory of natural rights ever written, in which he argued that natural rights provided an unsuitable basis for stable legal and political arrangements. All the essays published in this volume, with the exception of Emancipate your Colonies!, an important early critique of colony-holding, are based on the original manuscript sources, many of which have not been previously published in any form.

Compact and easy to use, this handy guide includes travel and language tips plus a two-way mini-dictionary, so you’ll never be stuck for the right word. It is arranged by topic in clear, colour-coded sections, and offers phrases for every eventuality. Its simple-to-read format allows you to build your own sentences and develop your language skills. Also featuring a comprehensive menu-reader and pronunciation guide, it is the ideal companion to any trip. 224-page book.

The 12 lectures presented in Representation Theories and Algebraic Geometry focus on the very rich and powerful interplay between algebraic geometry and the representation theories of various modern mathematical structures, such as reductive groups, quantum groups, Hecke algebras, restricted Lie algebras, and their companions. This interplay has been extensively exploited during recent years, resulting in great progress in these representation theories. Conversely, a great stimulus has been given to the development of such geometric theories as D-modules, perverse sheafs and equivariant intersection cohomology. The range of topics covered is wide, from equivariant Chow groups, decomposition classes and Schubert varieties, multiplicity free actions, convolution algebras, standard monomial theory, and canonical bases, to annihilators of quantum Verma modules, modular representation theory of Lie algebras and combinatorics of representation categories of Harish-Chandra modules.

The eighteenth century is an important period both in the history of science and in the history of languages. Interest in science, and especially in the useful sciences, exploded and a new, modern approach to scientific discovery and the accumulation of knowledge emerged. It was during this century, too, that ideas on language and language practice began to change. Latin had been more or less the only written language used for scientific purposes, but gradually the vernaculars became established as fully acceptable alternatives for scientific writing. The period is of interest, moreover, from a genre-historical point of view. Encyclopedias, dictionaries and also correspondence played a key role in the spread of scientific ideas. At the time, writing on scientific matters was not as distinct from fiction, poetry or religious texts as it is today, a fact which also gave a creative liberty to individual writers. In this volume, seventeen authors explore, from a variety of angles, the construction of a scientific language and discourse. The chapters are thematically organized into four sections, each contributing to our understanding of this dynamic period in the history of science: their themes are the forming of scientific communities, the emergence of new languages of science, the spread of scientific ideas, and the development of scientific writing. A particular focus is placed on the Swedish botanist Carl Linnaeus (1707-1778). From the point of view of the natural sciences, Linnaeus is renowned for his principles for defining genera and species of organisms and his creation of a uniform system for naming them. From the standpoint of this volume, however, he is also of interest as an example of a European scientist of the eighteenth century. This volume is unique both in its broad linguistic approach - including studies on textlinguistics, stylistics, sociolinguistics, lexicon and nomenclature - and in its combination of language studies, philosophy of language, history and sociology of science. The book covers writing in different European languages: Swedish, German, French, English, Latin, Portuguese, and Russian. With its focus on the history of scientific language and discourse during a dynamic period in Europe, the book promises to contribute to new insights both for readers interested in language history and those with an interest in the history of ideas and thought.

This five-volume series covers the entire range of technologies used in the petroleum refining industry. The books are intended for students and for the engineers and technicians who operate in refineriesIn addition to the detailed description of the conventional separation processes used in refining, this volume devotes ample space to discussing future developments. These include enhancements to existing technologies and the introduction of new technologies and separation processes that are as yet seldom implemented in the industry.Contents: 1. Basics of separation operations. 2. Thermodynamics: phase equilibria. 3. Mass transfer and efficiency of separation operations. 4. Distillation, absorption and stripping. 5. Distillation, absorption and stripping in the petroleum industry. 6. Liquid-liquid extraction. 7. Solvent extraction in the oil industry. 8. Crystallization. 9. Crystallization in the oil industry: solvent dewaxing. 10. Adsorption. 11. Adsorption in the oil and gas industry. 12. Membrane separation. References. Index.

Serge Lang is not only one of the top mathematicians of our time, but also an excellent writer. He has made innumerable and invaluable contributions in diverse fields of mathematics and was honoured with the Cole Prize by the American Mathematical Society as well as with the Prix Carriere by the French Academy of Sciences. Here, 83 of his research papers are collected in four volumes, ranging over a variety of topics of interest to many readers.